Probability Distributions: Exponential Distribution Flashcards
1
Q
Exponential Distribution
A
- Continuous distribution, widely used.
- Estimates the lapse of time between the independent events.
- In other words, it describes the times in between events a process in which events occur continuously and independently at a constant average rate.
- Exponential distribution is the time between events in a Poisson process
- If the number of occurrences follows a Poisson distribution, the lapse of time between these events is distributed exponentially
- Used to model items with a constant failure rate
2
Q
Key Difference between Poisson and Exponential
A
3
Q
The formula of Exponential Distribution
A
- The probability density function (pdf)
- The cumulative distribution function (cdf)
- The mean and standard deviations are equal
4
Q
Shape of the Exponential Distribution
A
The distributions of a random variable shows the exponential distribution is shown below. The curve declines continuously, implying that as x rises, the probability attached to it decreases.
5
Q
When is exponential distribution used?
A
- Describes the times in between events a process in which events occur continuously and independently at a constant average rate.
- To describe the time between successive occurrences when all occurrences follow an exponential
- To predict the length of time that properly maintained equipment will operate
- Approximate the time between outcomes
- When a probability of an outcome is consistent throughout the time period
Applications
- The number of hours a mobile phone runs before its battery dies out.
- The time it takes for a call center executive respond to a caller
- The probability of receiving a phone call in the next 30 minutes
- The amount of time (may be in months) a car battery lasts
6
Q
Exponential Distribution Example
A
